Note on Certain Inequality

A new proof is given of the nonuniform version of Fisher's inequality, first proved by Majumdar. The proof is ``elementary,'' in the sense of being purely combinatorial and not using ideas from linear algebra. However, no nonalgebraic proof of the n-dimensional analogue of this result (Theorem 3 her

A method based on sequences is applied to derive inequalities between the arithmetic᎐geometric mean of Gauss, the logarithmic mean, and certain other means.

In this paper explicit bounds on retarded Gronwall-Bellman and Bihari-like integral inequalities and their two independent variable generalizations are established. Some applications are also given to illustrate the usefulness of one of our results.

In this note, it is shown that the Hardy᎐Hilbert inequality for double series can Ž . be improved by introducing a proper weight function of the form rsin rp y Ž . 1y1rr Ž Ž . . O n rn with O n ) 0 into either of the two single summations. When r r r s 2, the classical Hilbert inequality is improved

Duffin and Schaeffer type inequalities related to some ultraspherical polynomials are established. One of the results obtained reads as follows: Let f be a real algebraic polynomial of degree at most n, 1) for all k # [1, ..., n]. Moreover, equality holds if and only if f =\T n . 1998 Academic Pres